论文信息 - Critical length for semi-oriented bootstrap percolation

Critical length for semi-oriented bootstrap percolation

We consider the behaviour of semi-oriented bootstrap percolation restricted to a finite square or torus. We prove that as the probability of initial occupancy p tends to zero, the side length required for a two-dimensional torus to have non-negligible chance of filling itself up is between for universal constants c and C. We show similar results for the side length required for a square to show significant clustering behaviour.

Thomas Mountford

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